Random Dynamical Systems
Ludwig Arnold
Reading Time
at 250 WPM9h 48m
The average reader, reading at a speed of 250 WPM, would take 9h 48m to read Random Dynamical Systems.
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Random Dynamical Systems
Published
1998
Publisher
Springer Berlin Heidelberg
Pages
588
ISBN-13
9783642083556
ISBN-10
3642083552
Description
This book is the first systematic presentation of the theory of random dynamical systems, i.e. of dynamical systems under the influence of some kind of randomness. The theory comprises products of random mappings as well as random and stochastic differential equations. The author's approach is based on Oseledets'multiplicative ergodic theorem for linear random systems, for which a detailed proof is presented. This theorem provides us with a random substitute of linear algebra and hence can serve as the basis of a local theory of nonlinear random systems. In particular, global and local random invariant manifolds are constructed and their regularity is proved. Techniques for simplifying a system by random continuous or smooth coordinate tranformations are developed (random Hartman-Grobman theorem, random normal forms). Qualitative changes in families of random systems (random bifurcation theory) are also studied. A dynamical approach is proposed which is based on sign changes of Lyapunov exponents and which extends the traditional phenomenological approach based on the Fokker-Planck equation. Numerous instructive examples are treated analytically or numerically. The main intention is, however, to present a reliable and rather complete source of reference which lays the foundations for future works and applications.
Subjects
Heinemann Mathematics
Elements
Philosophiae naturalis principia mathematica
Tractatus logico-philosophicus
De la terre à la lune
Principles of Anatomy and Physiology
Frequently Asked Questions
How many pages are in Random Dynamical Systems?
This edition of Random Dynamical Systems has approximately 588 pages. Please note, this is an estimate and the exact page count can vary between hardcover, paperback, and e-book versions.
How long does it take to read Random Dynamical Systems?
For most readers, Random Dynamical Systems typically takes between 12h 15m and 8h 10m to complete. This is based on the book's length of approximately 147,000 words and common reading speeds.
Here's a detailed breakdown: • Continuous reading at 250 WPM: approximately 9h 48m of focused reading • Casual reading (30 minutes/day): you could finish in roughly 20 days • Estimated word count: 147,000 words
Your individual reading time will vary based on your personal reading pace, the amount of daily reading time, and your familiarity with the subject matter.
What is the word count of Random Dynamical Systems?
The estimated word count for Random Dynamical Systems is approximately 147,000 words. This figure is calculated using industry-standard methods that consider genre-specific word density patterns, typical formatting and layout characteristics, and standard words-per-page ratios for published books.
This is an approximation — actual word count may vary based on font size, formatting, edition, and the presence of illustrations or charts.
Who is the author of Random Dynamical Systems?
Random Dynamical Systems was written by Ludwig Arnold.
When was Random Dynamical Systems published?
The publication date for this specific edition is 1998. The original work may have been published on a different date.